Quasi-triangular, factorizable Leibniz bialgebras and relative Rota–Baxter operators

IF 1 3区 数学 Q1 MATHEMATICS Forum Mathematicum Pub Date : 2024-08-05 DOI:10.1515/forum-2023-0268
Chengming Bai, Guilai Liu, Yunhe Sheng, Rong Tang
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Abstract

We introduce the notion of quasi-triangular Leibniz bialgebras, which can be constructed from solutions of the classical Leibniz Yang–Baxter equation (CLYBE) whose skew-symmetric parts are invariant. In addition to triangular Leibniz bialgebras, quasi-triangular Leibniz bialgebras contain factorizable Leibniz bialgebras as another subclass, which lead to a factorization of the underlying Leibniz algebras. Relative Rota–Baxter operators with weights on Leibniz algebras are used to characterize solutions of the CLYBE whose skew-symmetric parts are invariant. On skew-symmetric quadratic Leibniz algebras, such operators correspond to Rota–Baxter type operators. Consequently, we introduce the notion of skew-symmetric quadratic Rota–Baxter Leibniz algebras, such that they give rise to triangular Leibniz bialgebras in the case of weight 0, while they are in one-to-one correspondence with factorizable Leibniz bialgebras in the case of nonzero weights.
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准三角形、可因化莱布尼兹双桥和相对罗塔-巴克斯特算子
我们引入了准三角形莱布尼兹双桥的概念,它可以从经典莱布尼兹杨-巴克斯特方程(CLYBE)的解中构造出来,其偏斜对称部分是不变的。除了三角形莱布尼兹双桥之外,准三角形莱布尼兹双桥还包含另一个子类--可因子化莱布尼兹双桥,这导致了底层莱布尼兹桥的因子化。莱布尼兹二元组上带权重的相对罗塔-巴克斯特算子被用来描述其偏斜对称部分不变的 CLYBE 解。在偏斜对称二次莱布尼兹布拉上,此类算子与罗塔-巴克斯特类型算子相对应。因此,我们引入了偏斜对称二次 Rota-Baxter 莱布尼兹代数的概念,即在权重为 0 的情况下,它们产生三角形莱布尼兹双桥,而在权重不为 0 的情况下,它们与可因式分解莱布尼兹双桥一一对应。
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来源期刊
Forum Mathematicum
Forum Mathematicum 数学-数学
CiteScore
1.60
自引率
0.00%
发文量
78
审稿时长
6-12 weeks
期刊介绍: Forum Mathematicum is a general mathematics journal, which is devoted to the publication of research articles in all fields of pure and applied mathematics, including mathematical physics. Forum Mathematicum belongs to the top 50 journals in pure and applied mathematics, as measured by citation impact.
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